Imagine a cube-shaped piece of Swiss cheese. We model the cheese through a 20x20x20 grid. For simplicity, we assume that each grid cube consists entirely of cheese or entirely of air. On the upper side of our cube of Swiss cheese we then pour water, which penetrates the cheese only through the air holes in the cube. The water may flow through a continuous channel from the top to the bottom, but it may only flow from one air cube to the next, if the two cubes are connected through a face (not just an edge or a corner). The water can also flow on detours such as in a sink drain trap, but it may not flow out on the side walls of the cheese cube.

Now let us programmaticaly implement that model of the Swiss cheese with a random distribution of air and cheese cubes as described above, with the probability of cheese *p* and the probability of air *1 - p* and simulate water flowing through the cheese in order to find out, whether the water flows through to the bottom of the Swiss cheese cube.

By repeatedly simulating water flowing throught the Swiss cheese cube with different probabilities of cheese and air we can ascertain a relationship between p and the probability of water flowing through to the bottom of the Swiss cheese cube, let's name it *q*. The result looks like this:

```
q
1 ************************
0.8 *
0.6 *
0.4 *
0.2 *
0 ***********
0 0.2 0.4 0.6 0.8 1 p
```

My qustion: **Why such a strange curve?**

This question is taken from the 23rd federal competition of informatics in Germany (2004/2005). An answer to "why such a strange curve" has not been provided on the web (solutions provided).

I hope I'm at the right place with this sort of question.